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3 February, 09:51

The management of a private investment club has a fund of $270,000 earmarked for investment in stocks. To arrive at an acceptable overall level of risk, the stocks that management is considering have been classified into three categories: high risk (x), medium risk (y), and low risk (z). Management estimates that high risk stocks will have a rate of return of 15%/year; medium risk stocks, 10%/year; and low risk stocks, 6%/year. The investment in low risk stocks is to be twice the sum of the investments in stocks of the other two categories. If the investment goal is to have a rate of return of 9% on the total investment, determine how much the club should invest in each type of stock. (Assume that all the money available for investment is invested.)

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  1. 3 February, 09:58
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    Investment in stock

    X=90,000

    Y=0

    Z=180,000

    Step-by-step explanation:

    As we know, the total investment is 270,000. It means: x+y+z=270,000

    And z=2 (x+y) as investment in z is double the sum of other two investments.

    So x+y+2 (x+y) = 270,000. Which gives

    X+y=90,000 ... Eq 1

    So, z = 2 (x+y) = 180,000

    And we also know, 15%x+10%y+6%z=270,000*9%

    Putting value of z:

    15%x+10%y+6% (2 (x+y)) = 24,300.

    15%x+10%y+6% (180,000) = 24,300

    15%x+10%y=24,300-10,800

    15%x+10%y=13,500

    15x+10y=1,350,000 ... eq 2

    Solving eq 1 and eq 2 to get:

    X=90,000

    Y=0
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